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15 Aug 2019, 01:30
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E
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
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Question Stats:
45% (01:43) correct
55%
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wrong
based on 173
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A stack of colored cards is sorted such that x blue cards, y red cards, and z green cards are placed on top of each yellow card, and there are no cards left over. How many yellow cards are there?
(1) The numbers of blue, red, and green cards placed on a given yellow card are in the ratio 3:4:7, respectively.
(2) A total of 90 blue cards, 120 red cards, and 210 green cards are placed.
(1) The numbers of blue, red, and green cards placed on a given yellow card are in the ratio 3:4:7, respectively.
(2) A total of 90 blue cards, 120 red cards, and 210 green cards are placed.
15 Aug 2019, 01:39
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Bunuel
Given: A stack of colored cards is sorted such that x blue cards, y red cards, and z green cards are placed on top of each yellow card, and there are no cards left over.
Asked: How many yellow cards are there?
(1) The numbers of blue, red, and green cards placed on a given yellow card are in the ratio 3:4:7, respectively.
The numbers of blue, red, and green cards placed on a given yellow card will be 3k, 4k & 7k respectively
k in the number of yellow cards
k may take multiple values
NOT SUFFICIENT
(2) A total of 90 blue cards, 120 red cards, and 210 green cards are placed.
A stack of colored cards is sorted such that x blue cards, y red cards, and z green cards are placed on top of each yellow card, and there are no cards left over.
x:y:z = 90:120:210 = 3:4:7
90 = 3k ; 120 = 4k ; 210 = 7k
k can take multiple values
NOT SUFFICIENT
Combining (1) & (2)
(1) The numbers of blue, red, and green cards placed on a given yellow card are in the ratio 3:4:7, respectively.
The numbers of blue, red, and green cards placed on a given yellow card will be 3k, 4k & 7k respectively
(2) A total of 90 blue cards, 120 red cards, and 210 green cards are placed.
A stack of colored cards is sorted such that x blue cards, y red cards, and z green cards are placed on top of each yellow card, and there are no cards left over.
x:y:z = 90:120:210 = 3:4:7
90 = 3k ; 120 = 4k ; 210 = 7k
k in the number of yellow cards
k can take multiple values
NOT SUFFICIENT
IMO E
17 Aug 2019, 06:04
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Hi, since we know the number of total cards using statement 2, then we can determine the number of yellow cards, cant we ?
